Extension of boundary homeomorphisms to mappings of finite distortion

Abstract

We provide sufficient conditions so that a homeomorphism of the real line or of the circle admits an extension to a mapping of finite distortion in the upper half-plane or the disk, respectively. Moreover, we can ensure that the quasiconformal dilatation of the extension satisfies certain integrability conditions, such as $p$-integrability or exponential integrability. Mappings satisfying the latter integrability condition are also known as David homeomorphisms. Our extension operator is the same as the one used by Beurling and Ahlfors in their celebrated work. We prove an optimal bound for the quasiconformal dilatation of the Beurling--Ahlfors extension of a homeomorphism of the real line, in terms of its symmetric distortion function. More specifically, the quasiconformal dilatation is bounded above by an average of the symmetric distortion function and below by the symmetric distortion function itself. As a consequence, the quasiconformal dilatation of the Beurling--Ahlfors extension of a homeomorphism of the real line is (sub)exponentially integrable, is $p$-integrable, or has a $BMO$ majorant if and only if the symmetric distortion is (sub)exponentially integrable, is $p$-integrable, or has a $BMO$ majorant, respectively. These theorems are all new and reconcile several sufficient extension conditions that have been established in the past.